wyszukanych pozycji: 3
Random Processes and Learning
ISBN: 9783642461866 / Angielski / Miękka / 2012 / 308 str. Termin realizacji zamówienia: ok. 20 dni roboczych. The aim of" the present monograph is two-fold: (a) to give a short account of the main results concerning the theory of random systems with complete connections, and (b) to describe the general learning model by means of random systems with complete connections. The notion of chain with complete connections has been introduced in probability theory by ONICESCU and MIHOC (1935a). These authors have set themselves the aim to define a very broad type of dependence which takes into account the whole history of the evolution and thus includes as a special case the Markovian one. In a sequel of...
The aim of" the present monograph is two-fold: (a) to give a short account of the main results concerning the theory of random systems with complete c...
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194,08 zł |
Unimodality of Probability Measures
ISBN: 9789048147694 / Angielski / Miękka / 2010 / 256 str. Termin realizacji zamówienia: ok. 20 dni roboczych. Labor omnia vincit improbus. VIRGIL, Georgica I, 144-145. In the first part of his Theoria combinationis observationum erroribus min- imis obnoxiae, published in 1821, Carl Friedrich Gauss [Gau80, p.10] deduces a Chebyshev-type inequality for a probability density function, when it only has the property that its value always decreases, or at least does l not increase, if the absolute value of x increases . One may therefore conjecture that Gauss is one of the first scientists to use the property of 'single-humpedness' of a probability density function in a meaningful probabilistic context....
Labor omnia vincit improbus. VIRGIL, Georgica I, 144-145. In the first part of his Theoria combinationis observationum erroribus min- imis obnoxiae, p...
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cena:
582,32 zł |
Unimodality of Probability Measures
ISBN: 9780792343189 / Angielski / Twarda / 1996 / 256 str. Termin realizacji zamówienia: ok. 20 dni roboczych. Labor omnia vincit improbus. VIRGIL, Georgica I, 144-145. In the first part of his Theoria combinationis observationum erroribus min imis obnoxiae, published in 1821, Carl Friedrich Gauss Gau80, p.10] deduces a Chebyshev-type inequality for a probability density function, when it only has the property that its value always decreases, or at least does l not increase, if the absolute value of x increases . One may therefore conjecture that Gauss is one of the first scientists to use the property of 'single-humpedness' of a probability density function in a meaningful probabilistic context....
Labor omnia vincit improbus. VIRGIL, Georgica I, 144-145. In the first part of his Theoria combinationis observationum erroribus min imis obnoxiae, pu...
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cena:
582,32 zł |